5 4 Completing the Square Warm Up Lesson

5 -4 Completing the Square Warm Up Lesson Presentation Lesson Quiz Holt Algebra 22

5 -4 Completing the Square Warm Up Write each expression as a trinomial. 1. (x – 5)2 2. (3 x + 5)2 x 2 – 10 x + 25 9 x 2 + 30 x + 25 Factor each expression. 3. x 2 – 18 + 81 (x – 9)2 4. 16 x 2 + 24 x + 9 (4 x + 3)2 Holt Algebra 2

5 -4 Completing the Square Objectives Solve quadratic equations by completing the square. Write quadratic equations in vertex form. Holt Algebra 2

5 -4 Completing the Square Vocabulary completing the square Holt Algebra 2

5 -4 Completing the Square Many quadratic equations contain expressions that cannot be easily factored. For equations containing these types of expressions, you can use square roots to find roots. Holt Algebra 2

5 -4 Completing the Square Reading Math Read as “plus or minus square root of a. ” Holt Algebra 2

5 -4 Completing the Square Example 1 A: Solving Equations by Using the Square Root Property Solve the equation. 4 x 2 + 11 = 59 4 x 2 = 48 x 2 = 12 Subtract 11 from both sides. Divide both sides by 4 to isolate the square term. Take the square root of both sides. Simplify. Holt Algebra 2

5 -4 Completing the Square Example 1 A Continued Check Holt Algebra 2 Use a graphing calculator.

5 -4 Completing the Square Example 1 B: Solving Equations by Using the Square Root Property Solve the equation. x 2 + 12 x + 36 = 28 (x + 6)2 = 28 Factor the perfect square trinomial Take the square root of both sides. Subtract 6 from both sides. Simplify. Holt Algebra 2

5 -4 Completing the Square Example 1 B Continued Check Holt Algebra 2 Use a graphing calculator.

5 -4 Completing the Square Check It Out! Example 1 a Solve the equation. 4 x 2 – 20 = 5 4 x 2 = 25 Add 20 to both sides. Divide both sides by 4 to isolate the square term. Take the square root of both sides. Simplify. Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 1 a Continued Check Holt Algebra 2 Use a graphing calculator.

5 -4 Completing the Square Check It Out! Example 1 b Solve the equation. x 2 + 8 x + 16 = 49 (x + 4)2 = 49 Factor the perfect square trinomial. Take the square root of both sides. Holt Algebra 2 x = – 4 ± Subtract 4 from both sides. x = – 11, 3 Simplify.

5 -4 Completing the Square Check It Out! Example 1 b Continued Check Holt Algebra 2 Use a graphing calculator.

5 -4 Completing the Square The methods in the previous examples can be used only for expressions that are perfect squares. However, you can use algebra to rewrite any quadratic expression as a perfect square. You can use algebra tiles to model a perfect square trinomial as a perfect square. The area of the square at right is x 2 + 2 x + 1. Because each side of the square measures x + 1 units, the area is also (x + 1), or (x + 1)2. This shows that (x + 1)2 = x 2 + 2 x + 1. Holt Algebra 2

5 -4 Completing the Square If a quadratic expression of the form x 2 + bx cannot model a square, you can add a term to form a perfect square trinomial. This is called completing the square. Holt Algebra 2

5 -4 Completing the Square The model shows completing the square for x 2 + 6 x by adding 9 unit tiles. The resulting perfect square trinomial is x 2 + 6 x + 9. Note that completing the square does not produce an equivalent expression. Holt Algebra 2

5 -4 Completing the Square Example 2 A: Completing the Square Complete the square for the expression. Write the resulting expression as a binomial squared. x 2 – 14 x + Find . Add. x 2 – 14 x + 49 Factor. (x – 7)2 Check Find the square of the binomial. (x – 7)2 = (x – 7) = x 2 – 14 x + 49 Holt Algebra 2

5 -4 Completing the Square Example 2 B: Completing the Square Complete the square for the expression. Write the resulting expression as a binomial squared. x 2 + 9 x + Find Add. Factor. Holt Algebra 2 . Check Find the square of the binomial.

5 -4 Completing the Square Check It Out! Example 2 a Complete the square for the expression. Write the resulting expression as a binomial squared. x 2 + 4 x + Find x 2 + 4 x + 4 (x + 2)2 Check . Add. Factor. Find the square of the binomial. (x + 2)2 = (x + 2) = x 2 + 4 x + 4 Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 2 b Complete the square for the expression. Write the resulting expression as a binomial squared. x 2 – 4 x + Find x 2 – 4 x + 4 (x – 2)2 Check Holt Algebra 2 . Add. Factor. Find the square of the binomial. (x – 2)2 = (x – 2) = x 2 – 4 x + 4

5 -4 Completing the Square Check It Out! Example 2 c Complete the square for the expression. Write the resulting expression as a binomial squared. x 2 + 3 x + Find Add. Factor. Holt Algebra 2 . Check Find the square of the binomial.

5 -4 Completing the Square You can complete the square to solve quadratic equations. Holt Algebra 2

5 -4 Completing the Square Example 3 A: Solving a Quadratic Equation by Completing the Square Solve the equation by completing the square. x 2 = 12 x – 20 x 2 – 12 x = – 20 x 2 – 12 x + = – 20 + Collect variable terms on one side. Set up to complete the square. Add x 2 – 12 x + 36 = – 20 + 36 Holt Algebra 2 to both sides. Simplify.

5 -4 Completing the Square Example 3 A Continued (x – 6)2 = 16 Factor. Take the square root of both sides. x – 6 = ± 4 x – 6 = 4 or x – 6 = – 4 x = 10 or x = 2 Holt Algebra 2 Simplify. Solve for x.

5 -4 Completing the Square Example 3 B: Solving a Quadratic Equation by Completing the Square Solve the equation by completing the square. 18 x + 3 x 2 = 45 x 2 + 6 x = 15 x 2 + 6 x + = 15 + Divide both sides by 3. Set up to complete the square. Add x 2 + 6 x + 9 = 15 + 9 Holt Algebra 2 to both sides. Simplify.

5 -4 Completing the Square Example 3 B Continued (x + 3)2 = 24 Factor. Take the square root of both sides. Simplify. Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 3 a Solve the equation by completing the square. x 2 – 2 = 9 x Collect variable terms on one side. x 2 – 9 x = 2 x 2 – 9 x + =2+ Set up to complete the square. Add to both sides. Simplify. Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 3 a Continued Factor. 9 x – = ± 89 4 2 x= Holt Algebra 2 9 ± 89 2 Take the square root of both sides. Simplify.

5 -4 Completing the Square Check It Out! Example 3 b Solve the equation by completing the square. 3 x 2 – 24 x = 27 Divide both sides by 3. x 2 – 8 x = 9 x 2 – 8 x + =9+ Set up to complete the square. Add to both sides. Simplify. Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 3 b Continued Solve the equation by completing the square. Factor. Take the square root of both sides. Simplify. x – 4 =– 5 or x – 4 = 5 x =– 1 or x = 9 Holt Algebra 2 Solve for x.

5 -4 Completing the Square Recall the vertex form of a quadratic function from lesson 5 -1: f(x) = a(x – h)2 + k, where the vertex is (h, k). You can complete the square to rewrite any quadratic function in vertex form. Helpful Hint In Example 3, the equation was balanced by adding to both sides. Here, the equation is balanced by adding and subtracting side. Holt Algebra 2 on one

5 -4 Completing the Square Example 4 A: Writing a Quadratic Function in Vertex Form Write the function in vertex form, and identify its vertex. f(x) = x 2 + 16 x – 12 f(x)=(x 2 + 16 x + ) – 12 – Set up to complete the square. Add and subtract f(x) = (x + 8)2 – 76 Simplify and factor. Because h = – 8 and k = – 76, the vertex is (– 8, – 76). Holt Algebra 2 .

5 -4 Completing the Square Example 4 A Continued Check Use the axis of symmetry formula to confirm vertex. y = f(– 8) = (– 8)2 + 16(– 8) – 12 = – 76 Holt Algebra 2

5 -4 Completing the Square Example 4 B: Writing a Quadratic Function in Vertex Form Write the function in vertex form, and identify its vertex g(x) = 3 x 2 – 18 x + 7 g(x) = 3(x 2 – 6 x) + 7 Factor so the coefficient of x 2 is 1. g(x) = 3(x 2 – 6 x + Set up to complete the square. )+7– 2 Add . Because is multiplied by 3, you must subtract 3. Holt Algebra 2

5 -4 Completing the Square Example 4 B Continued g(x) = 3(x – 3)2 – 20 Simplify and factor. Because h = 3 and k = – 20, the vertex is (3, – 20). Check A graph of the function on a graphing calculator supports your answer. Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 4 a Write the function in vertex form, and identify its vertex f(x) = x 2 + 24 x + 145 f(x) = (x 2 + 24 x + ) + 145 – Set up to complete the square. Add and subtract f(x) = (x + 12)2 + 1 Simplify and factor. Because h = – 12 and k = 1, the vertex is (– 12, 1). Holt Algebra 2 .

5 -4 Completing the Square Check It Out! Example 4 a Continued Check Use the axis of symmetry formula to confirm vertex. y = f(– 12) = (– 12)2 + 24(– 12) + 145 = 1 Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 4 b Write the function in vertex form, and identify its vertex g(x) = 5 x 2 – 50 x + 128 g(x) = 5(x 2 – 10 x) + 128 Factor so the coefficient of x 2 is 1. g(x) = 5(x 2 – 10 x + Set up to complete the square. ) + 128 – Add . Because is multiplied by 5, you must subtract 5. Holt Algebra 2

5 -4 Completing the Square Check It Out! Example 4 b Continued g(x) = 5(x – 5)2 + 3 Simplify and factor. Because h = 5 and k = 3, the vertex is (5, 3). Check A graph of the function on a graphing calculator supports your answer. Holt Algebra 2

5 -4 Completing the Square Lesson Quiz 1. Complete the square for the expression x 2 – 15 x +. Write the resulting expression as a binomial squared. Solve each equation. 2. x 2 – 16 x + 64 = 20 3. x 2 – 27 = 4 x Write each function in vertex form and identify its vertex. 5. f(x) = 2 x 2 – 12 x – 27 4. f(x)= x 2 + 6 x – 7 f(x) = (x + 3)2 – 16; f(x) = 2(x – 3)2 – 45; (– 3, – 16) (3, – 45) Holt Algebra 2